New bounds and constructions for constant weighted $X$-codes
Abstract
As a crucial technique for integrated circuits (IC) test response compaction, -compact employs a special kind of codes called -codes for reliable compressions of the test response in the presence of unknown logic values (s). From a combinatorial view point, Fujiwara and Colbourn \cite{FC2010} introduced an equivalent definition of -codes and studied -codes of small weights that have good detectability and -tolerance. An -code is an binary matrix with column vectors as its codewords. The parameters correspond to the test quality of the code. In this paper, bounds and constructions for constant weighted -codes are investigated. First, we obtain a general result on the maximum number of codewords for an -code of weight , and we further improve this lower bound for the case with and through the probabilistic method. Then, using tools from additive combinatorics and finite fields, we present some explicit constructions for constant weighted -codes with and , which are optimal for the case when and nearly optimal for the case when . We also consider a special class of -codes introduced in \cite{FC2010} and improve the best known lower bound on the maximum number of codewords for this kind of -codes.
Cite
@article{arxiv.1903.06434,
title = {New bounds and constructions for constant weighted $X$-codes},
author = {Xiangliang Kong and Xin Wang and Gennian Ge},
journal= {arXiv preprint arXiv:1903.06434},
year = {2021}
}
Comments
14 pages, 2 figures, 1 table; accept by IEEE Transactions on Information Theory